Answer:
D. 321,600.
Explanation:
Present value is the current value of a future amount that is to be received or paid out.
Given:
Present value, P = $60000
Present value of ordinary annuity for the remaining 6 years = 4.36
The Present value, PV of the note is equal to the first payment + the Present value of ordinary annuity (all at 10%) of the remaining six payments
Sales revenue = $60000 + (60,000 × 4.36)
= $60000 + $261,600
= $321,600
Thus, sales revenue of $321,600.
A data warehouse is an integrated collection of data that can include seemingly unrelated information, no matter where it is stored in the company.
An enterprise data warehouse (EDW), sometimes referred to as a data warehouse (DW or DWH) in computing, is a system used for reporting and data analysis and is regarded as a key element of business intelligence.
data warehouse DWs serve as a central repository for combined data from a variety of sources.
They keep both recent and old data in a single location that is utilized to provide analytical reports for employees across the whole company.
The operational systems upload the data that is kept in the warehouse (such as marketing or sales).
Before being used in the data warehouse for reporting, the data may go via operational data storage and require data cleansing for extra activities to ensure data quality.
Learn more about the data warehouse here:
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Answer:
$1,051,780
Explanation:
The computation of the liability for unredeemed coupons is shown below:
= (Number of coupons issued × estimated percentage - processed coupons) × coupon worth
= (728,000 coupons × 70% - 265,000 coupons) × $4.30
= 244,600 coupons × $4.30
= $1,051,780
Simply first we determined the number of unredeemed coupons and then multiplied it by the coupon worth
Answer:
c) $767,464.54
Explanation:
The computation of the future value of an annuity is shown below:
As we know that
Future value of annuity F = Payment made × ((1 + rate of interest)^t - 1) ÷ r
ate of interest
= $3,400 × (1.092^35 - 1) ÷ 0.092
= $3,400 × 225.7249
= $767,464.54
Hence, the future value of an annuity is $767,464.54
Therefore the correct option is c.
